QUESTION IMAGE
Question
objective 4: i can write proofs involving segments.
- fill in the blanks to complete the proof. use items from the bank below – not all items will be used. (3 points)
given, ( ab = 4x - 9 ) and ( bc = 15 ) and ( b ) is the midpoint of ( ac )
prove ( x = 6 )
diagram: segment ( ac ) with ( b ) as midpoint
statements:
- ( ab = 4x - 9 ) and ( bc = 15 ) and ( b ) is the midpoint of ( ac )
- ( ab = bc )
- blank
- ( 4x = 24 )
- ( x = 6 )
reasons:
- given
- blank (substitution property of equality)
- blank
- division property of equality
bank (from the box): definition of midpoint, subtraction property of equality, addition property of equality, symmetric property of equality, ( 4x - 9 = 15 )
- using your answer from part a, find ( de ) (1 point)
To solve the proof, we analyze each step:
Step 1: Justify \( AB = BC \)
Since \( B \) is the midpoint of \( AC \), by the Definition of Midpoint, a midpoint divides a segment into two equal parts. Thus, \( AB = BC \).
Step 2: Justify \( 4x - 9 = 15 \)
We know \( AB = 4x - 9 \) (given) and \( BC = 15 \) (given). From Step 1, \( AB = BC \). By the Substitution Property of Equality, we substitute \( AB \) with \( 4x - 9 \) and \( BC \) with \( 15 \), so \( 4x - 9 = 15 \).
Step 3: Justify \( 4x = 24 \)
Starting with \( 4x - 9 = 15 \), we use the Addition Property of Equality (add 9 to both sides):
\( 4x - 9 + 9 = 15 + 9 \)
Simplifying, \( 4x = 24 \).
Step 4: Justify \( x = 6 \)
Starting with \( 4x = 24 \), we use the Division Property of Equality (divide both sides by 4):
\( \frac{4x}{4} = \frac{24}{4} \)
Simplifying, \( x = 6 \).
Filling the Table:
| STATEMENTS | REASONS |
|---|---|
| \( AB = BC \) | Definition of Midpoint |
| \( 4x - 9 = 15 \) | Substitution Property of Equality |
| \( 4x = 24 \) | Addition Property of Equality |
| \( x = 6 \) | Division Property of Equality |
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To solve the proof, we analyze each step:
Step 1: Justify \( AB = BC \)
Since \( B \) is the midpoint of \( AC \), by the Definition of Midpoint, a midpoint divides a segment into two equal parts. Thus, \( AB = BC \).
Step 2: Justify \( 4x - 9 = 15 \)
We know \( AB = 4x - 9 \) (given) and \( BC = 15 \) (given). From Step 1, \( AB = BC \). By the Substitution Property of Equality, we substitute \( AB \) with \( 4x - 9 \) and \( BC \) with \( 15 \), so \( 4x - 9 = 15 \).
Step 3: Justify \( 4x = 24 \)
Starting with \( 4x - 9 = 15 \), we use the Addition Property of Equality (add 9 to both sides):
\( 4x - 9 + 9 = 15 + 9 \)
Simplifying, \( 4x = 24 \).
Step 4: Justify \( x = 6 \)
Starting with \( 4x = 24 \), we use the Division Property of Equality (divide both sides by 4):
\( \frac{4x}{4} = \frac{24}{4} \)
Simplifying, \( x = 6 \).
Filling the Table:
| STATEMENTS | REASONS |
|---|---|
| \( AB = BC \) | Definition of Midpoint |
| \( 4x - 9 = 15 \) | Substitution Property of Equality |
| \( 4x = 24 \) | Addition Property of Equality |
| \( x = 6 \) | Division Property of Equality |